Estimation and Optimal Structure Selection of High-Dimensional Toeplitz Covariance Matrix

Yihe Yang, Jie Zhou, Jianxin Pan

Research output: Contribution to journalArticlepeer-review

Abstract

The estimation of structured covariance matrix arises in many elds. An appropriate covariance structure not only improves the accuracy of covariance estimation but also increases the eciency of mean parameter estimators in statistical models. In this paper, a novel statistical method is proposed, which selects the optimal Toeplitz covariance structure and estimates the covariance matrix, simultaneously. An entropy loss function with nonconvex penalty is employed as a matrix-discrepancy measure, under which the optimal selection of sparse or nearly sparse Toeplitz structure and the parameter estimators of covariance matrix are made, simultaneously, through its minimization. The cases of both low-dimensional (p n) and high-dimensional (p > n) covariance matrix estimation are considered. The resulting Toeplitz structured covariance estimators are guaranteed to be positive denite and consistent. Asymptotic properties are investigated and simulation studies are conducted, showing that very high accurate Toeplitz covariance structure estimation is made. The proposed method is then applied to
Original languageEnglish
JournalJournal of Multivariate Analysis
Publication statusPublished - 2021

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